Understanding Rotations in Geometry

Scaling

Translation

Reflection

Rotation

Scaling matrix

Rotation matrix

Reflection matrix

Translation matrix

The x-coordinate becomes negative, and the y-coordinate becomes positive.

The x-coordinate becomes negative, and the y-coordinate remains the same.

The x-coordinate becomes zero, and the y-coordinate becomes positive.

The x-coordinate becomes positive, and the y-coordinate becomes negative.

It makes sine negative and cosine positive.

It does not affect the trigonometric functions.

It makes both sine and cosine negative.

It makes cosine negative and sine positive.

The point returns to its original position.

The point moves to the opposite quadrant.

The point moves to the adjacent quadrant.

The point remains in the same quadrant.

Add the coordinates of the rotation point to the result.

Subtract the coordinates of the rotation point from the result.

Divide the coordinates of the rotation point by the result.

Multiply the coordinates of the rotation point by the result.

Add the rotation point's coordinates to the original point.

Divide the rotation point's coordinates by the original point.

Subtract the rotation point's coordinates from the original point.

Multiply the rotation point's coordinates by the original point.

Subtract the angles.

Multiply the angles.

Add the angles.

Divide the angles.

The line disappears.

The line rotates to a parallel position.

The line remains unchanged.

The line rotates to a perpendicular position.

The point moves to a new position.

The point returns to its original position.

The point moves to the opposite position.

The point disappears.